The (4,p)-arithmetic hyperbolic lattices, p≥ 2, in three dimensions

Abstract

We identify the finitely many arithmetic lattices in the orientation preserving isometry group of hyperbolic 3-space H3 generated by an element of order 4 and and element of order p≥ 2. Thus has a presentation of the form f,g: f4=gp=w(f,g)=·s=1 We find that necessarily p∈ \2,3,4,5,6,∞\, where p=∞ denotes that g is a parabolic element, the total degree of the invariant trace field k=Q(\2(h):h∈\) is at most 4, and each orbifold is either a two bridge link of slope r/s surgered with (4,0), (p,0) Dehn surgery (possibly a two bridge knot if p=4) or a Heckoid group with slope r/s and w(f,g)=(wr/s)r with r∈ \1,2,3,4\. We give a discrete and faithful representation in PSL(2,C) for each group and identify the associated number theoretic data.